# Mathematical Communications,Vol. 20 No. 2, 2015

Original scientific paper

On a maximal subgroup of the Thompson simple group

Ayoub Basheer Mohammed Basheer ; Department of Mathematical Sciences, North-West University (Mafikeng), Mmabatho, South Africa
Jamshid Moori ; Department of Mathematical Sciences, North-West University (Mafikeng), Mmabatho, South Africa

 Fulltext: english, pdf (199 KB) pages 201-218 downloads: 638* cite APA 6th EditionBasheer, A.B.M. & Moori, J. (2015). On a maximal subgroup of the Thompson simple group. Mathematical Communications, 20 (2), 201-218. Retrieved from https://hrcak.srce.hr/149786 MLA 8th EditionBasheer, Ayoub Basheer Mohammed and Jamshid Moori. "On a maximal subgroup of the Thompson simple group." Mathematical Communications, vol. 20, no. 2, 2015, pp. 201-218. https://hrcak.srce.hr/149786. Accessed 14 Apr. 2021. Chicago 17th EditionBasheer, Ayoub Basheer Mohammed and Jamshid Moori. "On a maximal subgroup of the Thompson simple group." Mathematical Communications 20, no. 2 (2015): 201-218. https://hrcak.srce.hr/149786 HarvardBasheer, A.B.M., and Moori, J. (2015). 'On a maximal subgroup of the Thompson simple group', Mathematical Communications, 20(2), pp. 201-218. Available at: https://hrcak.srce.hr/149786 (Accessed 14 April 2021) VancouverBasheer ABM, Moori J. On a maximal subgroup of the Thompson simple group. Mathematical Communications [Internet]. 2015 [cited 2021 April 14];20(2):201-218. Available from: https://hrcak.srce.hr/149786 IEEEA.B.M. Basheer and J. Moori, "On a maximal subgroup of the Thompson simple group", Mathematical Communications, vol.20, no. 2, pp. 201-218, 2015. [Online]. Available: https://hrcak.srce.hr/149786. [Accessed: 14 April 2021]

Abstracts
The present paper deals with a maximal subgroup of the Thompson group, namely the group $2^{1+8}_{+}{^{\cdot}}A_{9}:= \overline{G}.$ We compute its conjugacy classes using the coset analysis method, its inertia factor groups and Fischer matrices, which are required for the computations of the character table of $\overline{G}$ by means of Clifford-Fischer Theory.

Hrčak ID: 149786

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